Overview

The Peter Chew Method for Quadratic Equations is a simple and efficient approach for solving quadratic equations problem. Its objective is to make it easier for the upcoming generation to solve quadratic equations, including higher order function problems that cannot be solved by current methods. The French mathematician, Veda established the relationship between the equation root and the coefficient in 1615. Veda's theorem states that if α and β are two roots of the quadratic equation ax2+bx+c=0 and a 0. Then the sum of the two roots, α+β = -b/a, the product of the two roots, αβ = c/a . The current method for solving quadratic equations involves finding the values of α +β and αβ using Veda's theorem, and then converting the problem given into the α+β and αβ forms, and then substituting the values of α+β and αβ to the problem given obtain the answer. However, this method is inadequate for solving higher order function quadratic equations, since it is difficult to convert them into α+β and αβ forms With the Peter Chew method, we can solve higher order function quadratic equations . without the need to convert them into α+β and αβ forms. Additionally, this approach is applicable to quadratic equations with complex roots and complex coefficients. The Peter Chew method involves finding the roots of the quadratic equation, denoting them as α and β, and then substituting these values to the problem given to find the answer.

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